We present a five-dimensional solitonic framework in which particle masses arise as geometric Noether charges, without quantization postulates or empirical input. The mass law is derived from a factorization theorem for the elliptic monodromy function, while a Puiseux closure theorem shows that the exponent αα is a rational algebraic invariant rather than a fitted parameter. The resulting spectrum is discrete and sectorized, with explicit selection rules and falsifiable predictions. Numerical multi-sector analysis confirms the asymptotic relation ℓ∼3/k2 3/k²ℓ∼3/k2. This establishes a fully constrained geometric mechanism for mass generation.
Noel COPINET (Sun,) studied this question.
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